Cohomology of GLd(F) in non-defining characteristic via the quantum schur algebra

Abstract

Let G = GLd(F) be the general linear group over a field of cardinal q, and let k be a field of positive characteristic which does not divide q(q-1). Building on the works of Cline, Parshall, and Scott, we show how to compute Ext-groups between kG-modules using the quantum Schur algebra. The main novelty is our ability to compute these Ext-groups in higher degree than what was done before. More precisely, let be the order of q in k. In previous work, this method enabled the computation of the cohomology groups H*(GLd,M) in degree *≤ -1. We show that for a lot of modules M, we can compute these cohomology groups in higher degree, with an example where we can compute until degree 3(-1). We also show some new result on Ext-groups between modules over the quantum Schur algebra along the way.